# Calculate how many ones in bits and bits inverting [duplicate]

Possible Duplicate:
How many 1s in an n-bit integer?

Hello

How to calculate how many ones in bits?

``````1100110 -> 4
101 -> 2
``````

And second question:

How to invert bits?

``````1100110 -> 0011001
101 -> 010
``````

Thanks

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Many duplicates, e.g. How many 1s in an n-bit integer? and What does this function do?. Also should really be two separate questions. –  Paul R Mar 28 '11 at 8:36
also should ask second question in a separate question anyway –  jk. Mar 28 '11 at 9:42

## marked as duplicate by Paul R, Johnsyweb, Cheers and hth. - Alf, jk., Ken WhiteMar 28 '11 at 14:17

1. You can loop while the number is non-zero, and increment a counter when the last bit is set. Or if you are working on Intel architecture, you can use the `popcnt` instruction in inline assembly.

``````int count_bit_set(unsigned int x) {
int count = 0;
while (x != 0) {
count += (x & 1);
x = x >> 1;
}
return count;
}
``````
2. You use the `~` operator.

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Thank you! How to cout bits? I mean instead of 5 -> I want to see 101 –  VextoR Mar 28 '11 at 8:48
Use `std::bitset` : `std::bitset<32> bitset(5); std::cout << bitset << std::endl;`. –  Sylvain Defresne Mar 28 '11 at 8:55

If you can get your bits into a `std::bitset`, you can use the `flip` method to invert, and the `count` method to count the bits.

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+1: this ties in better with the question than `~`, flipping bits without rounding the number of bits up to the size of the data type. –  Tony D Mar 28 '11 at 9:35

The book Hacker's Delight by Henry S Warren Jr. contains lots of useful little gems on computing this sort of thing - and lots else besides. Everyone who does low level bit twiddling should have a copy :)

The counting-1s section is 8 pages long!

One of them is:

``````int pop(unsigned x)
{
x = x - ((x >> 1) & 0x55555555);
x = (x & 0x33333333) + ((x >> 2) & 0x33333333);
x = (x + (x >> 4)) & 0x0F0F0F0F;
x = x + (x >> 8);
x = x + (x >> 16);
return x & 0x0000003F;
}
``````

A potentially critical advantage compared to the looping options already presented is that the runtime is not variable. If it's inside a hard-real-time interrupt service routine this is much more important than "fastest-average-computation" time.

There's also a long thread on bit counting here: Best algorithm to count the number of set bits in a 32-bit integer?

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Inverting bits: `x = ~x;`

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For the first question, Fast Bit Counting has a few ways of doing it, the simplest being:

``````int bitcount (unsigned int n) {
int count = 0;
while (n) {
count += n & 0x1u;
n >>= 1;
}
return count;
}
``````

For the second question, use the ´~´ (bitwise negation) operator.

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To count the number of set bits in a number you can use the hakmem parallel counting which is the fastest approach not using predefined tables for parallel counting:

http://tekpool.wordpress.com/2006/09/25/bit-count-parallel-counting-mit-hakmem/

while inverting bits is really easy:

i = ~i;

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A somewhat trikcy (but faster) solution would be:

``````int setbitcount( unsigned int x )
{
int result;
for( result=0; x; x&=x-1, ++result )
;
return result;
}
``````

Compared to sylvain's soultion, this function iterates in the loop only the number of set bits. That is: for the number 1100110, it will do only 4 iteration (compared to 32 in Sylvain's algorithm).

The key is the expression x&=x-1, which will clear the least significant set bit. i.e.:
1) 1100110 & 1100101 = 1100100
2) 1100100 & 1100011 = 1100000
3) 1100000 & 1011111 = 1000000
4) 1000000 & 0111111 = 0

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You can also inverse bits by XOR'ing them with some number.
For example - inversing byte: `INVERTED_BYTE = BYTE ^ 0xFF`

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``````How to calculate how many ones in bits?
``````How to invert bits?
`i = ~i;`